Union-free families of sets and equations over fields

We consider the family of relative Thue equations where the parameter t, the root of unity µ and the solutions x and y are integers in the same imaginary quadratic number field. We prove that there are only trivial solutions (with |x|, |y| ≤ 1), if |t| is large enough or if the discriminant of the

We present a conjecture, with some supporting results, concerning the maximum size of a family of subsets satisfying the following conditions: the intersection of any two members of the family has cardinal@ at least s, and the intersection of the complements of any two members has cardinal@ at least

I prove that given a finite semigroup or finite associative ring S and a system ⌺ of equations of the form ax s b or xa s b, where a, b g S, x is an unknown, it is algorithmically impossible to decide whether or not ⌺ is solvable over S, that is, Ž whether or not there exists a bigger semigroup or r

A new strategy to solve the Kohn᎐Sham equations of density functional theory is presented which avoids diagonalization within a finite basis-set expansion. The implementation is based on an expansion of orbitals in terms of Gaussian functions and it is shown that the algorithm is competitive with mo